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О вариационности обыкновенного дифференциального уравнения четвертого порядка, описывающего движение центра тяжести колесных пар, колеса которых имеют выпуклый (к центру колеса) профиль поверхности катания of the wheel) tread surface profile is proved and the corresponding functional (Hamilton action) is constructed.
A simple `finite approximations' proofs of the Pontryagin maximum principle under reduced differentiability hypotheses,T], the functions f(cdot,cdot,cdot)colon[S,T]times {bf R}^ntimes{bf R}^mto{bf R}^n, L(cdot,cdot, cdot
Stability of the Magnetic Subsystem of 2D Magnets within the Crystal Orbital Hamilton Population Method using density functional theory and the method of the crystal orbital Hamilton population
NONPOTENTIALITY OF SOBOLEV SYSTEM AND CONSTRUCTION OF SEMIBOUNDED FUNCTIONAL of the Sobolev system cannot be deduced from a classical Hamilton principle. We pose the question that whether
Two-Valued Probability Measure on the Pontryagin Space an analogy of Kochen-Specker’s theorem in Pontryagin space: A Pontryagin spase H of dimension greater than
The pontryagin maximum principle and sufficient conditions for optimality in the L0 metricThe pontryagin maximum principle and sufficient conditions for optimality in the L0 metric
The pontryagin maximum principle and sufficient conditions for optimality in the L-0 MetricThe pontryagin maximum principle and sufficient conditions for optimality in the L-0 Metric
A simple 'finite approximations' proof of the Pontryagin maximum principle under reduced differentiability hypothesesTraditional proofs of the Pontryagin maximum principle (PMP) require the continuous
Two-Valued Probability Measure on the Pontryagin Space an analogy of Kochen-Specker’s theorem in Pontryagin space: A Pontryagin spase H of dimension greater than
Properties of extremals in optimal control problems with state constraints to the Pontryagin maximum principle are studied. It is shown that, from the conditions of the maximum principle
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